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---
id: 5e6decd8ec8d7db960950d1c
title: LU decomposition
challengeType: 5
forumTopicId: 385280
2021-01-13 02:31:00 +00:00
dashedName: lu-decomposition
2020-12-16 07:37:30 +00:00
---
# --description--
2021-02-06 04:42:36 +00:00
Every square matrix $A$ can be decomposed into a product of a lower triangular matrix $L$ and a upper triangular matrix $U$, as described in [LU decomposition ](https://en.wikipedia.org/wiki/LU decomposition ).
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$A = LU$
It is a modified form of Gaussian elimination.
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While the [Cholesky decomposition ](http://rosettacode.org/wiki/Cholesky decomposition ) only works for symmetric, positive definite matrices, the more general LU decomposition works for any square matrix.
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There are several algorithms for calculating $L$ and $U$.
To derive *Crout's algorithm* for a 3x3 example, we have to solve the following system:
\\begin{align}A = \\begin{pmatrix} a\_{11} & a\_{12} & a\_{13}\\\\ a\_{21} & a\_{22} & a\_{23}\\\\ a\_{31} & a\_{32} & a\_{33}\\\\ \\end{pmatrix}= \\begin{pmatrix} l\_{11} & 0 & 0 \\\\ l\_{21} & l\_{22} & 0 \\\\ l\_{31} & l\_{32} & l\_{33}\\\\ \\end{pmatrix} \\begin{pmatrix} u\_{11} & u\_{12} & u\_{13} \\\\ 0 & u\_{22} & u\_{23} \\\\ 0 & 0 & u\_{33} \\end{pmatrix} = LU\\end{align}
We now would have to solve 9 equations with 12 unknowns. To make the system uniquely solvable, usually the diagonal elements of $L$ are set to 1
$l\_{11}=1$
$l\_{22}=1$
$l\_{33}=1$
so we get a solvable system of 9 unknowns and 9 equations.
\\begin{align}A = \\begin{pmatrix} a\_{11} & a\_{12} & a\_{13}\\\\ a\_{21} & a\_{22} & a\_{23}\\\\ a\_{31} & a\_{32} & a\_{33}\\\\ \\end{pmatrix} = \\begin{pmatrix} 1 & 0 & 0 \\\\ l\_{21} & 1 & 0 \\\\ l\_{31} & l\_{32} & 1\\\\ \\end{pmatrix} \\begin{pmatrix} u\_{11} & u\_{12} & u\_{13} \\\\ 0 & u\_{22} & u\_{23} \\\\ 0 & 0 & u\_{33} \\end{pmatrix} = \\begin{pmatrix} u\_{11} & u\_{12} & u\_{13} \\\\ u\_{11}l\_{21} & u\_{12}l\_{21}+u\_{22} & u\_{13}l\_{21}+u\_{23} \\\\ u\_{11}l\_{31} & u\_{12}l\_{31}+u\_{22}l\_{32} & u\_{13}l\_{31} + u\_{23}l\_{32}+u\_{33} \\end{pmatrix} = LU\\end{align}
Solving for the other $l$ and $u$, we get the following equations:
$u\_{11}=a\_{11}$
$u\_{12}=a\_{12}$
$u\_{13}=a\_{13}$
$u\_{22}=a\_{22} - u\_{12}l\_{21}$
$u\_{23}=a\_{23} - u\_{13}l\_{21}$
$u\_{33}=a\_{33} - (u\_{13}l\_{31} + u\_{23}l\_{32})$
and for $l$:
$l\_{21}=\\frac{1}{u\_{11}} a\_{21}$
$l\_{31}=\\frac{1}{u\_{11}} a\_{31}$
$l\_{32}=\\frac{1}{u\_{22}} (a\_{32} - u\_{12}l\_{31})$
We see that there is a calculation pattern, which can be expressed as the following formulas, first for $U$
$u\_{ij} = a\_{ij} - \\sum\_{k=1}^{i-1} u\_{kj}l\_{ik}$
and then for $L$
$l\_{ij} = \\frac{1}{u\_{jj}} (a\_{ij} - \\sum\_{k=1}^{j-1} u\_{kj}l\_{ik})$
We see in the second formula that to get the $l\_{ij}$ below the diagonal, we have to divide by the diagonal element (pivot) $u\_{jj}$, so we get problems when $u\_{jj}$ is either 0 or very small, which leads to numerical instability.
The solution to this problem is *pivoting* $A$, which means rearranging the rows of $A$, prior to the $LU$ decomposition, in a way that the largest element of each column gets onto the diagonal of $A$. Rearranging the rows means to multiply $A$ by a permutation matrix $P$:
$PA \\Rightarrow A'$
Example:
\\begin{align} \\begin{pmatrix} 0 & 1 \\\\ 1 & 0 \\end{pmatrix} \\begin{pmatrix} 1 & 4 \\\\ 2 & 3 \\end{pmatrix} \\Rightarrow \\begin{pmatrix} 2 & 3 \\\\ 1 & 4 \\end{pmatrix} \\end{align}
The decomposition algorithm is then applied on the rearranged matrix so that
$PA = LU$
# --instructions--
The task is to implement a routine which will take a square nxn matrix $A$ and return a lower triangular matrix $L$, a upper triangular matrix $U$ and a permutation matrix $P$, so that the above equation is fullfilled. The returned value should be in the form `[L, U, P]` .
# --hints--
`luDecomposition` should be a function.
```js
assert(typeof luDecomposition == 'function');
```
`luDecomposition([[1, 3, 5], [2, 4, 7], [1, 1, 0]])` should return a array.
```js
assert(
Array.isArray(
luDecomposition([
[1, 3, 5],
[2, 4, 7],
[1, 1, 0]
])
)
);
```
`luDecomposition([[1, 3, 5], [2, 4, 7], [1, 1, 0]])` should return `[[[1, 0, 0], [0.5, 1, 0], [0.5, -1, 1]], [[2, 4, 7], [0, 1, 1.5], [0, 0, -2]], [[0, 1, 0], [1, 0, 0], [0, 0, 1]]]` .
```js
assert.deepEqual(
luDecomposition([
[1, 3, 5],
[2, 4, 7],
[1, 1, 0]
]),
[
[
[1, 0, 0],
[0.5, 1, 0],
[0.5, -1, 1]
],
[
[2, 4, 7],
[0, 1, 1.5],
[0, 0, -2]
],
[
[0, 1, 0],
[1, 0, 0],
[0, 0, 1]
]
]
);
```
`luDecomposition([[11, 9, 24, 2], [1, 5, 2, 6], [3, 17, 18, 1], [2, 5, 7, 1]])` should return `[[[1, 0, 0, 0], [0.2727272727272727, 1, 0, 0], [0.09090909090909091, 0.2875, 1, 0], [0.18181818181818182, 0.23124999999999996, 0.0035971223021580693, 1]], [[11, 9, 24, 2], [0, 14.545454545454547, 11.454545454545455, 0.4545454545454546], [0, 0, -3.4749999999999996, 5.6875], [0, 0, 0, 0.510791366906476]], [[1, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 0], [0, 0, 0, 1]]]` .
```js
assert.deepEqual(
luDecomposition([
[11, 9, 24, 2],
[1, 5, 2, 6],
[3, 17, 18, 1],
[2, 5, 7, 1]
]),
[
[
[1, 0, 0, 0],
[0.2727272727272727, 1, 0, 0],
[0.09090909090909091, 0.2875, 1, 0],
[0.18181818181818182, 0.23124999999999996, 0.0035971223021580693, 1]
],
[
[11, 9, 24, 2],
[0, 14.545454545454547, 11.454545454545455, 0.4545454545454546],
[0, 0, -3.4749999999999996, 5.6875],
[0, 0, 0, 0.510791366906476]
],
[
[1, 0, 0, 0],
[0, 0, 1, 0],
[0, 1, 0, 0],
[0, 0, 0, 1]
]
]
);
```
`luDecomposition([[1, 1, 1], [4, 3, -1], [3, 5, 3]])` should return `[[[1, 0, 0], [0.75, 1, 0], [0.25, 0.09090909090909091, 1]], [[4, 3, -1], [0, 2.75, 3.75], [0, 0, 0.9090909090909091]], [[0, 1, 0], [0, 0, 1], [1, 0, 0]]]` .
```js
assert.deepEqual(
luDecomposition([
[1, 1, 1],
[4, 3, -1],
[3, 5, 3]
]),
[
[
[1, 0, 0],
[0.75, 1, 0],
[0.25, 0.09090909090909091, 1]
],
[
[4, 3, -1],
[0, 2.75, 3.75],
[0, 0, 0.9090909090909091]
],
[
[0, 1, 0],
[0, 0, 1],
[1, 0, 0]
]
]
);
```
`luDecomposition([[1, -2, 3], [2, -5, 12], [0, 2, -10]])` should return `[[[1, 0, 0], [0, 1, 0], [0.5, 0.25, 1]], [[2, -5, 12], [0, 2, -10], [0, 0, -0.5]], [[0, 1, 0], [0, 0, 1], [1, 0, 0]]]` .
```js
assert.deepEqual(
luDecomposition([
[1, -2, 3],
[2, -5, 12],
[0, 2, -10]
]),
[
[
[1, 0, 0],
[0, 1, 0],
[0.5, 0.25, 1]
],
[
[2, -5, 12],
[0, 2, -10],
[0, 0, -0.5]
],
[
[0, 1, 0],
[0, 0, 1],
[1, 0, 0]
]
]
);
```
# --seed--
## --seed-contents--
```js
function luDecomposition(A) {
}
```
# --solutions--
```js
function luDecomposition(A) {
function dotProduct(a, b) {
var sum = 0;
for (var i = 0; i < a.length ; i + + )
sum += a[i] * b[i]
return sum;
}
function matrixMul(A, B) {
var result = new Array(A.length);
for (var i = 0; i < A.length ; i + + )
result[i] = new Array(B[0].length)
var aux = new Array(B.length);
for (var j = 0; j < B [ 0 ] . length ; j + + ) {
for (var k = 0; k < B.length ; k + + )
aux[k] = B[k][j];
for (var i = 0; i < A.length ; i + + )
result[i][j] = dotProduct(A[i], aux);
}
return result;
}
function pivotize(m) {
var n = m.length;
var id = new Array(n);
for (var i = 0; i < n ; i + + ) {
id[i] = new Array(n);
id[i].fill(0)
id[i][i] = 1;
}
for (var i = 0; i < n ; i + + ) {
var maxm = m[i][i];
var row = i;
for (var j = i; j < n ; j + + )
if (m[j][i] > maxm) {
maxm = m[j][i];
row = j;
}
if (i != row) {
var tmp = id[i];
id[i] = id[row];
id[row] = tmp;
}
}
return id;
}
var n = A.length;
var L = new Array(n);
for (var i = 0; i < n ; i + + ) { L [ i ] = new Array ( n ) ; L [ i ] . fill ( 0 ) }
var U = new Array(n);
for (var i = 0; i < n ; i + + ) { U [ i ] = new Array ( n ) ; U [ i ] . fill ( 0 ) }
var P = pivotize(A);
var A2 = matrixMul(P, A);
for (var j = 0; j < n ; j + + ) {
L[j][j] = 1;
for (var i = 0; i < j + 1 ; i + + ) {
var s1 = 0;
for (var k = 0; k < i ; k + + )
s1 += U[k][j] * L[i][k];
U[i][j] = A2[i][j] - s1;
}
for (var i = j; i < n ; i + + ) {
var s2 = 0;
for (var k = 0; k < j ; k + + )
s2 += U[k][j] * L[i][k];
L[i][j] = (A2[i][j] - s2) / U[j][j];
}
}
return [L, U, P];
}
```
